Infinite products with strongly B-multiplicative exponents
Abstract
Let N1,B(n) denote the number of ones in the B-ary expansion of an integer n. Woods introduced the infinite product P :=Πn ≥ 0 (2n+12n+2)(-1)N1,2(n) and Robbins proved that P = 1/2. Related products were studied by several authors. We show that a trick for proving that P2 = 1/2 (knowing that P converges) can be extended to evaluating new products with (generalized) strongly B-multiplicative exponents. A simple example is Πn ≥ 0 (Bn+1Bn+2)(-1)N1,B(n) = 1 B.
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